The binary actions of alternating groups
Abstract
Given a conjugacy class C in a group G we define a new graph, (C), whose vertices are elements of C; two vertices g,h∈ C are connected in (C) if [g,h]=1 and either gh-1 or hg-1 is in C. We prove a lemma that relates the binary actions of the group G to connectivity properties of (C). This lemma allows us to give a complete classification of all binary actions when G=An, an alternating group on n letters with n≥ 5.
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